On Completely Edge-Independent Spanning Trees in Locally Twisted Cubes

Abstract

A network can contain numerous spanning trees. If two spanning trees Ti,Tj do not share any common edges, Ti and Tj are said to be pairwisely edge-disjoint. For spanning trees T1, T2, ..., Tm, if every two of them are pairwisely edge-disjoint, they are called completely edge-independent spanning trees (CEISTs for short). CEISTs can facilitate many network functionalities, and constructing CEISTs as maximally allowed as possible in a given network is a worthy undertaking. In this paper, we establish the maximal number of CEISTs in the locally twisted cube network, and propose an algorithm to construct n2 CEISTs in LTQn, the n-dimensional locally twisted cube. The proposed algorithm has been actually implemented, and we present the outputs. Network broadcasting in the LTQn was simulated using n2 CEISTs, and the performance compared with broadcasting using a single tree.